Generic stability, randomizations, and NIP formulas

Abstract

We prove a number of results relating the concepts of Keisler measures, generic stability, randomizations, and NIP formulas. Among other things, we do the following: (1) We introduce the notion of a Keisler-Morley measure, which plays the role of a Morley sequence for a Keisler measure. We prove that if μ is fim over M, then for any Keisler-Morley measure λ in μ over M and any formula (x,b), i ∞ λ((xi,b)) = μ((x,b)). We also show that any measure satisfying this conclusion must be fam. (2) We study the map, defined by Ben Yaacov, taking a definable measure μ to a type rμ in the randomization. We prove that this map commutes with Morley products, and that if μ is fim then rμ is generically stable. (3) We characterize when generically stable types are closed under Morley products by means of a variation of ict-patterns. Moreover, we show that NTP2 theories satisfy this property. (4) We prove that if a local measure admits a suitably tame global extension, then it has finite packing numbers with respect to any definable family. We also characterize NIP formulas via the existence of tame extensions for local measures.